You shouldn't write something like \sqrt{-2}\not\in \mathbb{Z}. Just write that -2=n^2 has no solution. The let f(n)=3 is not good too, since you could think this is true for any n.

A function from X (the domain) to Y (the codomain) must map elements of X into Y. If there's some element of X that cannot be mapped, or some element of X that maps outside Y, then that ...

\displaystyle-{4} Explanation: Given: \displaystyle{f{{\left({n}\right)}}}={n}^{{2}}-{4} When \displaystyle{f{{\left({0}\right)}}} , we simply plug in \displaystyle{n}={0} into the ...

A good way to think about this is in terms of Pontryagin duality. Since we only care about the abelian group structure of \mathbb{R}, let's first get a nice characterization of this structure. As ...

Using\frac{x}{\log\left(x\right)}<\pi\left(x\right)<1.25506\,\frac{x}{\log\left(x\right)} if x is sufficiently large, we have\pi\left(n^{2}\right)-\pi\left(\frac{n^{2}+2n}{2}\right)>\frac{n^{2}}{\log\left(n^{2}\right)}-1.25506\frac{n^{2}+2n}{2\log\left(\frac{n^{2}}{2}+n\right)}=n^{2}\left(\frac{1}{\log\left(n^{2}\right)}-\frac{1.25506}{\log\left(\left(\frac{n^{2}}{2}+n\right)^{2}\right)}-\frac{1.25506}{n\log\left(\frac{n^{2}}{2}+n\right)}\right)>0 ...

Try a direct proof with two cases: (1) n is odd, (2) n is even.